(2) Hence show that $$ \sin 43^{\circ}+\sin 17^{\circ}=\cos 13^{\circ} $$

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To show that $$ \sin 43^{\circ} + \sin 17^{\circ} = \cos 13^{\circ} $$, we can use the sine addition formula and some trigonometric identities.

### Step 1: Use the sine addition formula

The sine addition formula states that:
$$
\sin A + \sin B = 2 \sin\left(\frac{A+B}{2}\right) \cos\left(\frac{A-B}{2}\right)
$$

In our case, let $$ A = 43^{\circ} $$ and $$ B = 17^{\circ} $$.

### Step 2: Calculate $$ A + B $$ and $$ A - B $$

1. Calculate $$ A + B $$:
   $$
   A + B = 43^{\circ} + 17^{\circ} = 60^{\circ}
   $$

2. Calculate $$ A - B $$:
   $$
   A - B = 43^{\circ} - 17^{\circ} = 26^{\circ}
   $$

### Step 3: Substitute into the sine addition formula

Now substitute $$ A + B $$ and $$ A - B $$ into the sine addition formula:
$$
\sin 43^{\circ} + \sin 17^{\circ = 2 \sin\left(\frac{60^{\circ}}{2}\right) \cos\left(\frac{26^{\circ}}{2}\right)
$$
This simplifies to:
$$
\sin 43^{\circ} + \sin 17^{\circ} = 2 \sin(30^{\circ}) \cos(13^{\circ})
$$

### Step 4: Evaluate $$ \sin(30^{\circ}) $$

We know that:
$$
\sin(30^{\circ}) = \frac{1}{2}
$$

### Step 5: Substitute back into the equation

Substituting this value back, we have:
$$
\sin 43^{\circ} + \sin 17^{\circ} = 2 \cdot \frac{1}{2} \cos(13^{\circ}) = \cos(13^{\circ})
$$

### Conclusion

Thus, we have shown that:
$$
\sin 43^{\circ} + \sin 17^{\circ} = \cos 13^{\circ}
$$

This completes the proof.
$$ \sin 43^{\circ} + \sin 17^{\circ} = \cos 13^{\circ} $$

(2) Hence show that \( \sin 43^{\circ}+\sin 17^{\circ}=\cos 13^{\circ} \)

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